On extendibility of a map induced by Bers isomorphism

Abstract

Let S be a closed Riemann surface of genus g(≥q 2) and set S=S \z0 \. Then we have the composed map r of a map r: T(S) × U → F(S) and the Bers isomorphism : F(S) → T(S), where F(S) is the Bers fiber space of S, T(X) is the Teichm\"uller space of X and U is the upper half-plane. The purpose of this paper is to show the map r:T(S)× U → T(S). has a continuous extension to some subset of the boundary T(S) × ∂ U.